Harnack inequality and Liouville-type theorems for Ornstein-Uhlenbeck and Kolmogorov operators

Abstract

We prove, with a purely analytic technique, a one-side Liouville theorem for a class of Ornstein--Uhlenbeck operators L0 in RN, as a consequence of a Liouville theorem at "t=- ∞" for the corresponding Kolmogorov operators L0 - ∂t in RN+1. In turn, this last result is proved as a corollary of a global Harnack inequality for non-negative solutions to ( L0 - ∂t) u = 0 which seems to have an independent interest in its own right. We stress that our Liouville theorem for L0 cannot be obtained by a probabilistic approach based on recurrence if N>2. We provide a self-contained proof of a Liouville theorem involving recurrent Ornstein--Uhlenbeck stochastic processes in the Appendix.